Continuity of the orthogeodesic foliation and ergodic theory of the earthquake flow

Abstract

In a previous paper, the authors extended Mirzakhani's (almost-everywhere defined) measurable conjugacy between the earthquake and horocycle flows to a measurable bijection. In this one, we analyze the continuity properties of this map and its inverse, proving that both are continuous at many points and in many directions. This lets us transfer measure convergence between the two systems, allowing us to pull back results from Teichm\"uller dynamics to deduce analogous statements for the earthquake flow.